On the geometry of measures with density bounds in a H\"older anisotropic setting

Abstract

We study the regularity of the support of a Radon measure μ on Rn+1 for which anisotropic versions of its n-dimensional density ratio and its doubling character are assumed to converge with H\"older rate. We show that in either case, if the support of μ is flat enough, then it is a C1,γ n-dimensional submanifold of Rn+1, for some γ∈ (0,1). If the flatness assumption is dropped, then the support of μ is the union of a C1,γ n-dimensional submanifold of Rn+1 and a closed singular set that is either empty if n≤ 2, or has Hausdorff dimension at most n-3 if n≥ 3.